Large-dimensional dynamic factor models and dynamic stochastic general equilibrium models, both widely used in empirical macroeconomics, deal with singular stochastic vectors, i.e., vectors of dimension r which are driven by a q-dimensional white noise, with q < r. The present paper studies cointegration and error correction representations for an I(1) singular stochastic vector yt. It is easily seen that yt is necessarily cointegrated with cointegrating rank c ≥ r − q. Our contributions are: (i) we generalize Johansen’s proof of the Granger representation theorem to I(1) singular vectors under the assumption that yt has rational spectral density; (ii) using recent results on singular vectors by Anderson and Deistler, we prove that for generic values of the parameters the autoregressive representation of yt has a finite-degree polynomial. The relationship between the cointegration of the factors and the cointegration of the observable variables in a large-dimensional factor model is also discussed.

Barigozzi, M., Lippi, M., Luciani, M. (2020). Cointegration and Error Correction Mechanisms for Singular Stochastic Vectors. ECONOMETRICS, 8(1), 1-23 [10.3390/econometrics8010003].

Cointegration and Error Correction Mechanisms for Singular Stochastic Vectors

Barigozzi, Matteo;
2020

Abstract

Large-dimensional dynamic factor models and dynamic stochastic general equilibrium models, both widely used in empirical macroeconomics, deal with singular stochastic vectors, i.e., vectors of dimension r which are driven by a q-dimensional white noise, with q < r. The present paper studies cointegration and error correction representations for an I(1) singular stochastic vector yt. It is easily seen that yt is necessarily cointegrated with cointegrating rank c ≥ r − q. Our contributions are: (i) we generalize Johansen’s proof of the Granger representation theorem to I(1) singular vectors under the assumption that yt has rational spectral density; (ii) using recent results on singular vectors by Anderson and Deistler, we prove that for generic values of the parameters the autoregressive representation of yt has a finite-degree polynomial. The relationship between the cointegration of the factors and the cointegration of the observable variables in a large-dimensional factor model is also discussed.
2020
Barigozzi, M., Lippi, M., Luciani, M. (2020). Cointegration and Error Correction Mechanisms for Singular Stochastic Vectors. ECONOMETRICS, 8(1), 1-23 [10.3390/econometrics8010003].
Barigozzi, Matteo; Lippi, Marco; Luciani, Matteo
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11585/723013
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